Orbit-blocking words and the average-case complexity of Whitehead's problem in the free group of rank 2

Abstract

Let F2 denote the free group of rank 2. Our main technical result of independent interest is: for any element u of F2, there is g in F2 such that no cyclically reduced image of u under an automorphism of F2 contains g as a subword. We then address computational complexity of the following version of the Whitehead automorphism problem: given a fixed u in F2, decide, on an input v in F2 of length n, whether or not v is an automorphic image of u. We show that there is an algorithm that solves this problem and has constant (i.e., independent of n) average-case complexity.